Seperation, irreducibility, Urysohn’s lemma and Tietze extension theorem for Cauchy spaces

Kula, Sümeyye; KULA, MUAMMER

doi:10.2298/fil2319417k

Seperation, irreducibility, Urysohn’s lemma and Tietze extension theorem for Cauchy spaces

Kula S., KULA M.

Filomat, vol.37, no.19, pp.6417-6426, 2023 (SCI-Expanded)

Publication Type: Article / Article
Volume: 37 Issue: 19
Publication Date: 2023
Doi Number: 10.2298/fil2319417k
Journal Name: Filomat
Journal Indexes: Science Citation Index Expanded (SCI-EXPANDED), Scopus, zbMATH
Page Numbers: pp.6417-6426
Keywords: Topological category, Cauchy space, Cauchy map, Separation, Connectedness, Compactness
Erciyes University Affiliated: Yes

Abstract

In this paper, we introduce two notions of closure operators in the category of Cauchy spaces which satisfy (weak) hereditariness, productivity and idempotency, and we characterize each of Ti, i = 0, 1, 2 cauchy spaces by using these closure operators as well as show each of these subcategories are isomorphic. Furthermore, we characterize the irreducible Cauchy spaces and examine the relationship among each of irreducible, connected Cauchy spaces. Finally, we present Urysohn’s lemma and Tietze extension theorem for Cauchy spaces.